Self-signed implicit certificates

ABSTRACT

There are disclosed systems and methods for creating a self-signed implicit certificate. In one embodiment, the self-signed implicit certificate is generated and operated upon using transformations of a nature similar to the transformations used in the ECQV protocol. In such a system, a root CA or other computing device avoids having to generate an explicit self-signed certificate by instead generating a self-signed implicit certificate.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application claims priority from U.S. Provisional Application No. 61/213,082, filed on May 5, 2009, and incorporated herein by reference.

TECHNICAL FIELD

The following relates generally to the generation of certificates in cryptographic systems.

BACKGROUND

A cryptographic system is a computer system that uses cryptography, typically to secure or authenticate data communication between a pair of computing devices connected to one another through a data communication link in the system. Each computing device has a cryptographic unit with the processing capacity to implement one or more cryptographic protocols used to secure or authenticate the data communication. The cryptographic protocols typically perform arithmetic operations on the bit strings representing parameters, messages, or data in the protocols to produce a bit string representing the output from the protocol.

In cryptographic systems, Certification Authorities (CAs) are trusted 3^(rd) parties responsible for vouching for the authenticity of public keys. For example, if correspondent A wishes to distribute its public key Q_(A), correspondent A may request that a CA issue a certificate for public key Q_(A). The certificate issued by the CA comprises a data portion and a signature portion. The data portion typically contains the identity of correspondent A, ID_(A), as well as the public key of correspondent A, Q_(A). The signature portion is created by signing the data portion using the CA's private key k_(CA). The issued certificate therefore binds the identity information ID_(A) of correspondent A to its public key Q_(A) through the signature of the CA.

When another correspondent, say correspondent B, receives the certificate, it can verify the signature using the public key of the CA, Q_(CA). Successful verification confirms that the data portion of the certificate has not been compromised and that therefore correspondent B has a valid and authentic copy of the public key Q_(A) of correspondent A.

This type of certificate is referred to as a conventional or “explicit” certificate since correspondent B explicitly verifies the CA's signature on the certificate to authenticate Q_(A). Assuming the CA has verified that correspondent A does indeed possess the private key k_(A) associated with Q_(A), then upon verification of the signature by correspondent B, correspondent B is also assured that correspondent A must possess the private key k_(A) associated with Q_(A).

In order for the scheme described above to operate securely, correspondent B must be sure that he possesses a valid and authentic copy of the public key Q_(CA) of the CA. One way to achieve this is to have another CA in a higher security domain issue a certificate on public key Q_(CA). For example, upon registration with the system, correspondent B may obtain the public key of a root CA, Q_(CA root). The root CA may then issue a certificate for Q_(CA), as well as for the public keys of other CAs in the system. Correspondent B may then verify the authenticity of Q_(CA) by using the public key Q_(CA root) of the root CA to verify the signature on the certificate issued by the root CA for the public key Q_(CA). In this way, the root CA and its public key Q_(CA root) form a root of trust that sits on top of a hierarchy of CAs signed above and chaining to the root CA.

Since Q_(CA root) forms a root of trust, it is important that a correspondent or entity possessing Q_(CA root) can be sure that their copy of Q_(CA root) is authentic and valid. This is typically achieved by the root CA issuing a self-signed explicit certificate for its public key Q_(CA root). The self-signed explicit certificate is generated as the output of a trusted event, typically witnessed and recorded by company officers and external auditors on a trusted system. The issued explicit self-signed certificate comprises the root public key along with additional information that is signed by the corresponding root private key k_(CA root). This additional information typically includes information such as the validity period of the key and/or key use restrictions. The recipient receives the self-signed explicit certificate, parses out the root public key Q_(CA root), and then uses the root public key Q_(CA root) to verify the additional information by verifying the signature.

Certain types of implicit certificates are also known in the art as an alternative way of distributing public keys. These implicit certificates require no explicit verification of the CA's signature, and therefore have the advantage that they are smaller in size and therefore offer bandwidth savings over conventional explicit certificates. A public key distributed via such an implicit certificate is implicitly authenticated by successfully using the public key in an operation that requires the use of the corresponding private key.

A well-known implicit certificate scheme is Elliptic Curve Qu-Vanstone (ECQV). This scheme is used to provide implicit authentication when the certificate is used in conjunction with an operation requiring the sender to use the corresponding private key, such as in ECDH, ECMQV, or ECDSA operations. A summary of ECQV is as follows.

A correspondent, A, wishing to establish a private/public key pair (k_(A), Q_(A)) and distribute public key Q_(A) via an implicit certificate, first uses its random number generator to generate a random bit string to be used as an ephemeral private key d_(A). The cryptographic unit then generates a corresponding ephemeral public key G_(A)=d_(A)G , where G is the base point on the underlying elliptic curve and a generator of the subgroup of the elliptic curve group. Correspondent A then sends G_(A), as well as any identity information, to the CA. The CA receives G_(A) and the identity information and performs the following steps:

-   -   1. Verify the received ephemeral public key G_(A) and identity         information. Verification can be done a number of ways. For         example, the CA may verify that G_(A) is a proper public key         that satisfies specific criteria, such as being a point on the         underlying elliptic curve, and/or satisfies defined statistical         criteria.     -   2. Generate an ephemeral key pair (d, Q), where Q=dG.     -   3. Compute public-key reconstruction value B_(A)=Q+G_(A).     -   4. Construct correspondent A certificate data I_(A) (e.g.         identity and validity information).     -   5. Format an implicit certificate IC_(A) containing B_(A) and         I_(A).     -   6. Compute e=Hash(IC_(A)).     -   7. Compute private key contribution data s=ed+k_(CA) (mod n),         where n is the order of base point G, and k_(CA) is the private         key of the CA.     -   8. Send IC_(A) and s to correspondent A.

Upon receiving IC_(A) and s, correspondent A performs the following steps to calculate its key pair (k_(A), Q_(A)):

-   -   1. Parse out B_(A) and I_(A) from IC_(A).     -   2. Verify the content of I_(A) according to the application         rules. For example, this may include verifying the information         is properly formatted, and/or verifying the content of I_(A)         matches the information sent by correspondent A to the CA.     -   3. Verify B_(A) is a valid point on the underlying curve.     -   4. Compute e=Hash(IC_(A)) and verify e≠0 .     -   5. Compute its private key k_(A)=ed_(A)+s (mod n).     -   6. Compute its corresponding public key Q_(A)=eB_(A)+Q_(CA),         where Q_(CA) is the public key of the CA.

The CA distributes the implicit certificate IC_(A) to the other correspondents. A particular correspondent, say correspondent B, receives IC_(A) and derives the public key Q_(A) of correspondent A as follows:

-   -   1. Parse out B_(A) and I_(A) from IC_(A);     -   2. Verify the content of I_(A) according to the application         rules, and verify B_(A) is a valid point on the underlying         curve;     -   3. Compute e=Hash(IC_(A)) and verify e≠0; and     -   4. Compute public key Q_(A)=eB_(A)+Q_(CA), where Q_(CA) is the         public key of the CA.

Correspondent B is therefore able to use the public key Q_(CA) of the CA to derive Q_(A) from the implicit certificate IC_(A). However, correspondent B has no way of knowing whether correspondent A possesses the corresponding private key k_(A). Therefore, authentication of correspondent A and its public key Q_(A) is not complete until an operation involving both Q_(A) and k_(A) is successfully performed. For example, correspondent A and correspondent B may subsequently engage in an ECMQV key agreement or ECDSA signature protocol, both of which require the use of Q_(A) and k_(A). If the key agreement or signature operations fail, then Q_(A) is not considered to be authentic or valid. On the other hand, if the key agreement or signature operations are successful, then correspondent A must possess k_(A), and the authenticity and validity of Q_(A) is implicitly verified.

Even though the CAs in such a system issue implicit certificates as above, the root CA must still distribute its root public key Q_(CA root), in a manner that binds the identity and validity information of Q_(CA root) to the root CA. Therefore, as described earlier, this is done by the root CA issuing a self-signed explicit certificate that is generated as the output of a trusted event. However, as mentioned earlier, an explicit certificate does not possess the bandwidth savings of an implicit certificate. Moreover, the transformations necessary to generate and operate on the self-signed explicit certificate do not complement the transformations necessary to generate and operate on the implicit certificates.

BRIEF DESCRIPTION

Representative embodiments will now be described by way of example only with reference to the accompanying drawings, in which:

FIG. 1 is a schematic representation of a network of computing devices organized in a hierarchical trust model;

FIG. 2 is a schematic representation of one specific example of the network of FIG. 1;

FIG. 3 is a schematic representation of the computing devices shown in FIG. 1;

FIG. 4 is a schematic of an embodiment of a method of generating a self-signed implicit certificate;

FIG. 5 is a schematic of an embodiment of a method of deriving a public key from a self-signed implicit certificate;

FIG. 6 is a schematic of another embodiment of a method of generating a self-signed implicit certificate;

FIG. 7 is a schematic of another embodiment of a method of deriving a public key from a self-signed implicit certificate;

FIG. 8 is a schematic of yet another embodiment of a method of generating a self-signed implicit certificate; and

FIG. 9 is a schematic of yet another embodiment of a method of deriving a public key from a self-signed implicit certificate.

DETAILED DESCRIPTION

In general terms, the following provides methods for generating and operating upon a self-signed implicit certificate. In one embodiment, the self-signed implicit certificate is generated by a root CA and is operated upon using transformations of a nature similar to the transformations used in the ECQV protocol. In this way, a root CA avoids having to generate an explicit self-signed certificate by instead generating a self-signed implicit certificate.

Systems are also disclosed for performing the methods, as well as a computer readable medium having stored thereon instructions for performing the methods.

Embodiments will now be described with reference to the figures. It will be appreciated that for simplicity and clarity of illustration, where considered appropriate, reference numerals may be repeated among the figures to indicate corresponding or analogous elements. In addition, numerous specific details are set forth in order to provide a thorough understanding of the embodiments described herein. However, it will be understood by those of ordinary skill in the art that the embodiments described herein may be practiced without these specific details. In other instances, well-known methods, procedures and components have not been described in detail so as not to obscure the embodiments described herein. Also, the description is not to be considered as limiting the scope of the embodiments described herein.

It will also be appreciated that that any module, component, or device exemplified herein that executes instructions may include or otherwise have access to computer readable media such as storage media, computer storage media, or data storage devices (removable and/or non-removable) such as, for example, magnetic disks, optical disks, or tape. Computer storage media may include volatile and non-volatile, removable and non-removable media implemented in any method or technology for storage of information, such as computer readable instructions, data structures, program modules, or other data. Examples of computer storage media include RAM, ROM, EEPROM, flash memory or other memory technology, CD-ROM, digital versatile disks (DVD) or other optical storage, magnetic cassettes, magnetic tape, magnetic disk storage or other magnetic storage devices, or any other medium which can be used to store the desired information and which can be accessed by an application, module, or both. Any such computer storage media may be part of the device or accessible or connectable thereto. Any application or module herein described may be implemented using computer readable/executable instructions that may be stored or otherwise held by such computer readable media.

Turning therefore to FIG. 1, an embodiment of a simple hierarchical trust model is shown. A root CA 102 is shown having two branch CAs 104 and 106. Correspondents 108 a-m operate under CA 104 and correspondents 108 n-t operate under and CA 106. It will be appreciated that m and t represent arbitrary integers. Root CA 102 has long-term private/public key pair (k_(CA root), Q_(CA root)), which is obtained during generation of a self-signed implicit certificate as described in detail below. CA 104 has long-term private/public key pair (k_(CA1), Q_(CA1)) and CA 106 has long-term private/public key pair (k_(CA2), Q_(CA2)).

FIG. 2 shows an example of one specific implementation of the network of FIG. 1 in which correspondent 108 a is an enterprise computer system (host system), and correspondents 108 b-m are mobile devices. In the specific implementation shown in FIG. 2, the host system 108 a provides a host service that offers push-based messages for mobile devices 108 b-m. The host service is capable of notifying and presenting data to a user in real-time at a given mobile device when the data arrives at the host system 108 a. The host system 108 a and mobile devices 108 b-m exchange public keys using certificates issued by the CA 104.

The embodiment shown in FIG. 2 is one specific implementation. More generally, and returning to FIG. 1, each of the CAs 102, 104, and 106, and correspondents 108 a-t are computing devices that implement a public key cryptographic system based on the intractability of the discrete logarithm problem in an elliptic curve group defined over a finite field, commonly referred to as an elliptic curve cryptosystem or ECC. As such, a private key k is used to generate a corresponding public key Q by performing a k-fold group operation on a generator G of the group of order n. The elliptic curve group is usually defined with an additive operation so that Q=kG.

In the embodiment shown in FIG. 1, implicit certificates for public keys are issued and operated on according to the ECQV implicit certificate scheme, which itself is known in the art and summarized earlier. For example, correspondent 108 a can send a request to CA 104 to issue an implicit certificate IC_(A) on which correspondent 108 a can subsequently operate to obtain a private/public key pair (k_(A),Q_(A)) and on which other correspondents can operate to obtain public key Q_(A), as described in the ECQV protocol . Correspondent 108 a therefore sends to CA 104, along with the request, an ephemeral key G_(A) and its identity information. CA 104 then issues implicit certificate IC_(A) according to the ECQV protocol described earlier and sends the implicit certificate IC_(A) and private contribution data s to correspondent 108 a. The correspondent 108 a uses the private key contribution data s and the implicit certificate IC_(A) to compute its private key k_(A). CA 104 may then send implicit certificate IC_(A) to one or more of the other correspondents 108 b-t. Any one of the other correspondents, for example correspondent 108 b, can use IC_(A) to compute Q_(A) and therefore permit secure communication or verification of signatures.

Correspondents 108 a and 108 b, as well as CA 104, are shown in greater detail in FIG. 3. Correspondents 108 a and 108 b each comprise: communication ports 204 for communicating with each other over communication channel 206; a communication port 208 for communicating with CA 104 over channels 110 a and 110 b respectively; a cryptographic processing unit 210 for performing operations operating on the elliptic curve group E defined over a chosen field; memory 212 for storing the results of such cryptographic operations and for storing information received via ports 204 and 208; and internal buses 214 for communicating information internally. Each correspondent 108 a and 108 b also communicates with other correspondents via communication ports 204, as well as with the root CA 102 (not shown). The channels 110 a, 110 b, and 206 may or may not be secure. Additionally, the cryptographic processing unit 210 may be hardware, computer readable software instructions, or a combination of both that is configured to perform cryptographic operations such as those described in detail below.

Similarly, CA 104 comprises: communication ports 224 for communicating with each of the correspondents 108 a-m over channels 110 a-m; a communication port 228 for communicating with root CA 102 over channel 112 a, which may or may not be secure; a cryptographic processing unit 230 for performing operations operating on the elliptic curve group E defined over a chosen field; memory 232 for storing the results of such cryptographic operations and for storing information received via ports 224 and 228; and internal buses 234 for communicating information internally. As above, the cryptographic processing unit 230 may be hardware, computer readable software instructions embodied in fixed form on a data carrier or in a memory, or a combination of both that is configured to perform cryptographic operations such as those described in detail below.

Although not shown in detail in the figures, the internal structure of CA 106 and root CA 102 is similar to CA 104, and the internal structure of correspondents 108 c-t is similar to correspondents 108 a and 108 b.

Upon registering with the system, each correspondent 108 a-t receives a self-signed implicit certificate from root CA 102, which each correspondent 108 a-t operates on to compute Q_(CA root). The generation of this self-signed implicit certificate by the root CA 102, as well as the process by which the self-signed implicit certificate is operated on to derive Q_(CA root), is explained in full detail below with reference to FIGS. 4 and 5.

The public key Q_(CA root) of the root CA 102 is stored in memory 212 by each correspondent 108 a-t. Q_(CA root) can subsequently be used by each correspondent 108 a-t to operate on implicit certificates issued by the root CA 102 according to the ECQV protocol and to begin a chain of trust. For example, assume correspondent 108 t receives an implicit certificate issued by CA 104 for the public key Q_(A) of correspondent 108 a. Correspondent 108 t does not necessarily have a copy of the public key Q_(CA1) of CA 104 or does not necessarily have a copy of Q_(CA1) that it can be sure is authentic and valid. However, root CA 102 can compute and issue an implicit certificate for public key Q_(CA1) and send this implicit certificate to correspondent 108 t. Correspondent 108 t can then operate on this implicit certificate using Q_(CA root) to obtain a valid and authentic copy of Q_(CA1), which it can then use to operate on the implicit certificate issued by CA 104 to obtain public key Q_(A). In this way, Q_(CA root) is used to initiate a chain of trust: correspondent 108 t uses its valid and authentic copy of Q_(CA root) to obtain a valid and authentic copy of Q_(CA1), which is used to obtain a valid and authentic copy of Q_(A).

It is clear that correspondent 108 t must begin with a valid and authentic copy of Q_(CA root) in order for the chain of trust to be secure. The public key Q_(CA root) of the root CA 102 is therefore distributed via a self-signed implicit certificate issued by the root CA 102, which is the output of a trusted event. Conveniently, though, this self-signed implicit certificate is generated using transformations of a nature similar to the transformations used in the ECQV protocol. The steps performed by the root CA 102 to generate a self-signed implicit certificate are described in detail below with reference to FIG. 4. FIG. 4 can comprise a set of computer readable instructions executed by the root CA 102.

In step 302, the cryptographic unit 230 of root CA 102 first generates a private/public key pair (d_(CA), B_(CA)). d_(CA) is an ephemeral bit string representing an integer, typically generated using a random number generating module within cryptographic unit 230, and B_(CA), a public-key reconstruction value, is calculated by unit 230 by performing a d_(CA)-fold operation on a bit string representing the generator G to obtain R_(CA)=d_(CA)G. B_(CA) is itself a public key. It is utilized in generating the self-signed implicit certificate and computing the public key Q_(CA root). The values B_(CA) and d_(CA) are temporarily stored, for example, in memory 232.

In step 304, root CA 102 next obtains or creates certificate data I_(CA) for its self-signed certificate. The certificate data I_(CA) includes information specific to the certificate. For example, the certificate information can include information such as: identification information, the validity period of the certificate, and/or the intended use of the public key.

Next, in step 306, root CA 102 operates on B_(CA) and I_(CA) to generate a self-signed implicit certificate IC_(CA root). This may be as simple as concatenating data values B_(CA) and I_(CA), e.g., IC_(CA root)=B_(CA)∥I_(CA). It will be appreciated that a compressed or encoded version of B_(CA) can be used in place of B_(CA), as long as B_(CA) can be derived by a recipient of the self-signed implicit certificate from the compressed or encoded version of B_(CA). For example, the certificate may include a compressed or encoded octet string derived from B_(CA), for example, perhaps the x-coordinate of B_(CA) along with a single bit representing the y-coordinate of B_(CA).

In step 308, cryptographic unit 230 of root CA 102 then calculates intermediate integer value e=Hash(IC_(CA root)), where Hash( )is a hash function. It is contemplated the e could instead be a truncated version of Hash(IC_(CA root)) The intermediate value e is stored temporarily, for example, in memory 232.

Finally, in step 310, cryptographic unit 230 uses integers d_(CA) and e to compute its private key k_(CA root) according to the formula k_(CA root)=ed_(CA) (mod n), where n is the order of base point G.

As will be shown in FIG. 5, the public key Q_(CA root) corresponding to private key k_(CA root) is computable by any party having the implicit certificate IC_(CA root).

Root CA 102 then sends its self-signed implicit certificate IC_(CA root) to each correspondent, including to correspondent 108 t.

Upon receiving self-signed implicit certificate IC_(CA root), correspondent 108 t performs the following steps described below with reference to FIG. 5 to obtain QC_(CA root). As will be seen, conveniently, the steps performed by correspondent 108 t involve transformations of a nature similar to the transformations used in the ECQV protocol. FIG. 5 can comprise a set of computer readable instructions executed by the correspondent 108 t.

In step 402, the cryptographic unit 210 of correspondent 108 t operates on IC_(CA root) to obtain values B_(CA) and I_(CA). For example, if the self-signed implicit certificate is of the form IC_(CA root)=B_(CA)∥I_(CA), the cryptographic unit 210 simply parses out the values B_(CA) and I_(CA). If the self-signed implicit certificate includes a compressed or encoded version of B_(CA), the cryptographic unit 210 operates on this compressed or encoded version of B_(CA) to obtain B_(CA).

In step 404, correspondent 108 t then verifies the contents of I_(CA) according to application rules. For example, correspondent 108 t may verify the identity and validity period. In some embodiments, the correspondent 108 t also verifies that B_(CA) is a valid point on the underlying curve.

Next, in step 406, cryptographic unit 210 of correspondent 108 t then calculates intermediate value e=Hash(IC_(CA root)), verifies e≠0, and stores e temporarily, for example, in memory 212. As explained earlier, it is contemplated the e could instead be a truncated version of Hash(IC_(CA root)).

Finally, in step 408, cryptographic unit 210 uses e and B_(CA) to compute public key Q_(CA root) corresponding to private key k_(CA root) according to the formula Q_(CA root)=eB_(CA).

Thus, by performing steps 402 to 408, correspondent 108 t obtains the public key Q_(CA root) of root CA 102 by operating on self-signed implicit certificate IC_(CA root). The self-signed implicit certificate IC_(CA root) binds the identification and validity information of root CA 102 to Q_(CA root) through I_(CA). As is clear from FIG. 5, correspondent 108 t can operate on IC_(CA root) itself without using another public key to compute Q_(CA root).

Upon the completion of step 408, correspondent 108 t may then use Q_(CA root) obtained via FIG. 5 to initiate a chain of trust. For example, the root CA 102 may use its private key k_(CA root), which was obtained by the method shown in FIG. 4, to issue an implicit certificate IC_(CA1) for the public key Q_(CA1) of CA 104 according to the ECQV protocol. Correspondent 108 t may then operate on IC_(CA1) using Q_(CA root) and the ECQV protocol to obtain a valid and authentic copy of Q_(CA1). The public key Q_(CA1) of CA 104 may then be used by correspondent 108 t to operate on implicit certificates issued by CA 104.

As discussed above, the transformations shown in FIGS. 4 and 5 are of a nature similar to the transformations used in the ECQV protocol. This is particularly convenient when implementing self-signed implicit certificates in existing ECQV schemes. Whilst not necessary, by using transformations of a nature similar to the transformations used in the ECQV protocol, the self-signed implicit signature scheme is more simply and efficiently implemented in existing ECQV schemes. Additionally, the issuance of a self-signed implicit certificate by the root CA offers bandwidth savings over issuing self-signed explicit certificates.

In an alternative embodiment, it is contemplated that the self-signed implicit signature scheme described in FIGS. 4 and 5 may also be used to implement short-lived root certificates without the need to re-issue full certificates. In such an embodiment, in step 304 of FIG. 4, when the root CA 102 creates its certificate data I_(CA), the root CA 102 also formats into I_(CA) time-sensitive information, such as the current date. On a daily basis, this value is updated and cryptographic unit 230 of root CA 102 repeats steps 308 to 312 to yield updated private key k_(CA root). Similarly, correspondent 108 t also updates the I_(CA) field of IC_(CA root) on a daily basis and repeats steps 406 and 408 of FIG. 4 to yield updated public key Q_(CA root). This ensures keys k_(CA root) and Q_(CA root) remain fresh.

In a further embodiment, it is contemplated that the root CA 102 runs multiple security domains using a single long-term private key r_(CA root), where r_(CA root) is used in place of d_(CA) in step 302 of the self-sign transformation of FIG. 4. For example, assume root CA 102 wishes to establish two security domains, one for correspondents 108 a-m and one for correspondents 108 n-t. Root CA 102 can issue two different public keys Q¹ _(CA root) and Q² _(CA root), one for each domain, simply by repeating the steps of FIG. 4 with two different certificate data values I_(CA1) and I_(CA2). Root CA 102 first uses d_(CA)=r_(CA root) and I_(CA1) to generate a self-signed implicit certificate IC¹ _(CA root) as described in FIG. 4, and this self-signed implicit certificate IC¹ _(CA root) is sent to correspondents 108 a-m to be operated on to obtain Q¹ _(CA root). Root CA 102 then uses d_(CA)=r_(CA root) and I_(CA2) to generate a self-signed implicit certificate IC² _(CA root) as described in FIG. 4 and sends IC² _(CA root) to correspondents 108 n-t to be operated on to obtain Q² _(CA root).

In the embodiments described with reference to FIGS. 4 and 5, the private key k_(CA root) of the root CA 102 is an integer calculated as k_(CA root)=ed_(CA) (mod n), and the corresponding public key Q_(CA root) of root CA 102 is an element of the group calculated as Q_(CA root)=eB_(CA). More generally, it is contemplated that instead the private key k_(CA root) can be an integer calculated as k_(CA root)=ed_(CA)+r (mod n) and the corresponding public key can be calculated as Q_(CA root)=eB_(CA)+rG , where r is an integer parameter, possibly private to the root CA 102, and rG is a public or publicly computable value. For example, r can be 0, 1, or d_(CA). If r=0, the private/public key pair (k_(CA root), Q_(CA root)) is of the form shown in FIGS. 4 and 5. If r=1, then k_(CA root)=ed_(CA)+1 (mod n) and Q_(CA root)=eB_(CA)+G. And if r=d_(CA), then k_(CA root)=ed_(CA)+d_(CA) (mod n) and Q_(CA root)=eB_(CA)+B_(CA).

The embodiments described above can be considered special cases of a more general protocol that advantageously follows many of the transformations used in the ECQV protocol. This general protocol is described with reference to FIGS. 6 and 7.

Assume root CA 102 wishes to establish a private/public pair (k_(CA root), Q_(CA root)) and issue a self-signed implicit certificate IC_(CA root) for its public key Q_(CA root). The root CA 102 therefore performs the steps described in detail below with reference to FIG. 6. FIG. 6 can comprise a set of computer readable instructions executed by the root CA 102.

In step 502, the cryptographic unit 230 of root CA 102 first generates a private/public key pair (d_(CA), B_(CA)). d_(CA) is an ephemeral bit string representing an integer, typically generated using a random number generating module within cryptographic unit 230, and B_(CA), a public-key reconstruction value, is calculated by unit 230 as B_(CA)=d_(CA)G.

In step 504, root CA 102 next obtains or creates certificate data I_(CA) for its self-signed certificate. The certificate data I_(CA) includes information specific to the certificate. For example, the certificate information can include information such as: identification information, the validity period of the certificate, and/or the intended use of the public key.

Next, in step 506, root CA 102 operates on B_(CA) and I_(CA) to generate a self-signed implicit certificate IC_(CA root). This may be as simple as concatenating data values B_(CA) and I_(CA), e.g., IC_(CA root)=B_(CA)∥I_(CA). It will be appreciated that a compressed or encoded version of B_(CA) can be used in place of B_(CA), as long as B_(CA) can be derived by a recipient of the self-signed implicit certificate from the compressed or encoded version of B_(CA).

In step 508, cryptographic unit 230 of root CA 102 then calculates intermediate integer value e=Hash(IC_(CA root)), where Hash( )is a hash function. It is contemplated the e could instead be a truncated version of Hash(IC_(CA root)).

Next, in step 510, cryptographic unit 230 computes private key contribution data s as s=ad_(CA)+r (mod n), where a is a publicly computable integer, and r is an integer parameter, possibly private to the root CA 102.

Finally, in step 512, cryptographic unit 230 compute its private key k_(CA root) using ephemeral public key d_(CA) and private key contribution data s according to the formula k_(CA root)=ed_(CA)+s (mod n), where n is the order of base point G.

A correspondent in the cryptographic system, say correspondent 108 t, can operate upon the self-signed implicit certificate IC_(CA root) to obtain Q_(CA root) by performing the steps described below with reference to FIG. 7. FIG. 7 can comprise a set of computer readable instructions executed by the correspondent 108 t.

In step 602, the cryptographic unit 210 of correspondent 108 t operates on IC_(CA root) to obtain values B_(CA) and I_(CA). For example, if the self-signed implicit certificate is of the form IC_(CA root)B_(CA)∥I_(CA), the cryptographic unit 210 simply parses out the values B_(CA) and I_(CA).

In step 604, correspondent 108 t then verifies the contents of I_(CA) according to application rules.

Next, in step 606, cryptographic unit 210 of correspondent 108 t then calculates intermediate value e=Hash(IC_(CA root)). As explained earlier, it is contemplated the e could instead be a truncated version of Hash(IC_(CA root)).

Finally, in step 608, cryptographic unit 210 obtains a and rG , and uses these values along with e and B_(CA) to compute public key Q_(CA root) corresponding to private key k_(CA root) according to the formula Q_(CA root)=(e+a)B_(CA)+rG.

Thus, by performing steps 602 to 608, correspondent 108 t obtains the public key Q_(CA root) of root CA 102 by operating on self-signed implicit certificate IC_(CA root).

It will be observed that the protocol described with reference to FIGS. 6 and 7 reduces to the protocol described with reference to FIGS. 4 and 5 when a=r=0. However, in general, other agreed-upon integer values of a and r can utilized to obtain other values for key pair (k_(CA root), Q_(CA root)). For example, if a=e and r=0, then k_(CA root)=2ed_(CA) and Q_(CA root)=2eB_(CA).

Although the invention has been described with reference to certain specific embodiments, various modifications thereof will be apparent to those skilled in the art without departing from the spirit and scope of the invention as outlined in the claims appended hereto.

For example, it will be appreciated that the self-signed implicit certificate schemes described above can be implemented in any trust model or topology, not just hierarchical trust models such as that shown in FIG. 1. Generally, in any trust model or topology in which a particular CA needs to issue a root public key or a public key having an equivalent purpose, the above-described method may be used.

More generally, it will be appreciated that the self-signed implicit certificates described above are not limited to self-signed implicit certificates issued by Certification Authorities per se. Instead, self-signed implicit certificate generation can be implemented in any computing device wishing to issue a self-signed public key bound to associated information or data. The associated information will most likely be, but is not limited to, information relating to the identity and/or validity of the public key. For example, in Pretty Good Privacy (PGP) systems, a correspondent may issue a self-signed implicit certificate for its public key. This correspondent is not Certification Authority per se, but is rather a correspondent wishing to distribute its public key using a self-signing technique.

Therefore, it will be appreciated that any of the methods described above with reference to FIGS. 4 to 7 can be implemented by a computing device in the cryptographic communication system. Instead of generating “certificate data”, data I relating to the public key is generated. This data I is combined with the public-key reconstruction value B to obtain a self-signed implicit certificate IC, which can be operated upon directly to obtain the public key Q of the computing device. Therefore, as used herein, the term “certificate”, such as in “implicit certificate”, is not limited to that which is issued by a Certification Authority, but generally extends to a public key bound to particular data, such as the identity of the owner of the public key, issued by a computing device in a cryptographic system.

It will also be appreciated that the techniques described above are not limited to elliptic curve systems, but may be extended to non-elliptic curve discrete logarithmic systems (e.g. systems based on an underlying multiplicative group) using straight-forward modifications apparent to a person skilled in the art having the benefit of the present disclosure.

Therefore, in view of the above embodiments, FIG. 8 discloses generally a method of generating a private key and establishing a self-signed implicit certificate that can be operated on to obtain a corresponding public key. The method is performed by a computing device in the cryptographic system and includes the following steps. In step 702, the computing device generates an ephemeral private key and a corresponding public-key reconstruction value. Then, in step 704, the computing device obtains data associated with the public key. Next, in step 706, the computing device operates on the public-key reconstruction value and the certificate data to obtain the self-signed certificate. Finally, in step 708, the computing device operates on the ephemeral private key and the self-signed implicit certificate in its cryptographic unit to obtain the private key.

The computing device in FIG. 8 is the issuer of the self-signed implicit certificate. This issued self-signed implicit certificate can subsequently be operated on by another computing device in the cryptographic system to obtain the public key corresponding to the private key. This is shown in FIG. 9. First, in step 802, the another computing device operates on the self-signed implicit certificate to obtain the public-key reconstruction value. Then, in step 804, the another computing device operates on the self-signed implicit certificate and the public-key reconstruction value in its cryptographic unit to obtain the public key. 

What is claimed is:
 1. A method of generating a private key and establishing a self-signed implicit certificate that can be operated on to obtain a corresponding public key, the method being performed by a computing device in a cryptographic system based on an underlying group of order n, the computing device having a cryptographic unit, the method comprising: the computing device generating an ephemeral private key and a corresponding public-key reconstruction value; the computing device obtaining data; the computing device operating on said public-key reconstruction value and said data to obtain said self-signed implicit certificate; and the computing device operating on said ephemeral private key and said self-signed implicit certificate to obtain said private key.
 2. The method of claim 1 wherein said computing device is a certification authority device that issues certificates in the cryptographic system, said data is certificate data, said private key is a root private key, and said public key is a root public key.
 3. The method of claim 2 wherein said operating on said public-key reconstruction value and said certificate data to obtain said self-signed implicit certificate comprises concatenating information derived from said public-key reconstruction value with said certificate data.
 4. The method of claim 3 wherein said information derived from said public-key reconstruction value is a compressed version of said public-key reconstruction value.
 5. The method of claim 2 wherein said root private key is an integer of the form k_(CA root)=ed_(CA)+r (mod n); wherein d_(CA) is said ephemeral private key, e is an integer derived using a hash of said self-signed implicit certificate, and r is an integer.
 6. The method of claim 5 wherein said integer r is either 0, 1, or d_(CA).
 7. The method of claim 2 wherein said certificate data includes validity information corresponding to said self-signed implicit certificate.
 8. The method of claim 2 further comprising said certification authority device incorporating time-sensitive information into said certificate data, and said certification authority device updating said self-signed implicit certificate on a periodic basis according to said time-sensitive information.
 9. The method of claim 2 further comprising said certification authority device generating a plurality of self-signed implicit certificates using different ephemeral private keys.
 10. A method of obtaining a public key from a self-signed implicit certificate, the method being performed by a computing device in a cryptographic system based on an underlying group of order n, the computing device having a cryptographic unit, the method comprising: the computing device operating on said self-signed implicit certificate to obtain a public-key reconstruction value; and the computing device operating on said self-signed implicit certificate and said public-key reconstruction value in said cryptographic unit to obtain said public key, said public key corresponding to a private key generated by an issuer of the self-signed implicit certificate.
 11. The method of claim 10 wherein the issuer of the self-signed implicit certificate is a certification authority device, said public key is a root public key, and said private key is a root private key.
 12. The method of claim 11 wherein said operating on said self-signed implicit certificate to obtain said public-key reconstruction value comprises parsing said self-signed implicit certificate to obtain another value derived from said public-key reconstruction value, and operating on said another value derived from said public-key reconstruction value to obtain said public-key reconstruction value.
 13. The method of claim 12 wherein said another value derived from said public-key reconstruction value is a compressed version of said public-key reconstruction value.
 14. The method of claim 11 wherein said group is an elliptic curve group, and said root public key is an element of said elliptic curve group of the form Q_(CA root)=eB_(CA)+rG; wherein B_(CA) is said public-key reconstruction value, e is an integer derived using a hash of said self-signed implicit certificate, G is a generator of said elliptic curve group, and r is an integer.
 15. The method of claim 14 wherein said integer r is either 0, 1, or d_(CA), where d_(CA)G=B_(CA).
 16. The method of claim 15 further comprising: the device operating on said self-signed implicit certificate to derive certificate data, and verifying content of said certificate data.
 17. A device for generating a private key and establishing a self-signed implicit certificate that can be operated on to obtain a corresponding public key, the device comprising a processor coupled to memory, the processor configured to: generate an ephemeral private key and a corresponding public-key reconstruction value; obtain data; operate on said public-key reconstruction value and said data to obtain said self-signed implicit certificate; and operate on said ephemeral private key and said self-signed implicit certificate to obtain said private key.
 18. A device comprising a processor coupled to memory, the processor configured to: operate on a self-signed implicit certificate to obtain a public-key reconstruction value; and operate on said self-signed implicit certificate and said public-key reconstruction value to obtain a public key, said public key corresponding to a private key generated by an issuer of the self-signed implicit certificate.
 19. A non-transitory computer readable medium for generating a private key and establishing a self-signed implicit certificate that can be operated on to obtain a corresponding public key, the non-transitory computer readable medium having stored thereon computer readable instructions for: generating an ephemeral private key and a corresponding public-key reconstruction value; obtaining data; operating on said public-key reconstruction value and said data to obtain said self-signed implicit certificate; and operating on said ephemeral private key and said self-signed implicit certificate to obtain said private key.
 20. A non-transitory computer readable medium having stored thereon computer readable instructions for: operating on a self-signed implicit certificate to obtain a public-key reconstruction value; and operating on said self-signed implicit certificate and said public-key reconstruction value to obtain a public key, said public key corresponding to a private key generated by an issuer of the self-signed implicit certificate.
 21. A method of generating a root private key k_(CA root) and establishing a self-signed implicit certificate IC_(CA root) that can be operated on to obtain a corresponding root public key, the method being performed by a certification authority device in a cryptographic system, the cryptographic system based on an underlying elliptic curve group of order n, the certification authority device having a cryptographic unit, the method comprising: the certification authority device generating an integer representing an ephemeral private key d_(CA), and operating on said ephemeral private key d_(CA) to compute an element of said elliptic curve group representing a corresponding public-key reconstruction value B_(CA); the certification authority device deriving a string from said public-key reconstruction value B_(CA); the certification authority device obtaining certificate data I_(CA); the certification authority device operating on said string and said certificate data I_(CA) to obtain said self-signed implicit certificate IC_(CA root); the certification authority device computing a hash H of said self-signed implicit certificate IC_(CA root) and operating on said hash H to derive an integer e; and the certification authority device operating on said integer e and said ephemeral private key d_(CA) to obtain said root private key k_(CA root).
 22. The method of claim 21 wherein said root private key k_(CA root) is an integer of the form k_(CA root)=ed_(CA) (mod n).
 23. A method of obtaining a root public key Q_(CA root) from a self-signed implicit certificate IC_(CA root) established by a certification authority device in a cryptographic system, the cryptographic system based on an underlying elliptic curve group of order n, the method being performed by a computing device having a cryptographic unit, the method comprising: the certification authority device computing a hash H of said self-signed implicit certificate IC_(CA root) in said cryptographic unit and operating on said hash H to derive an integer e; the certification authority device verifying the contents of said self-signed implicit certificate IC_(CA root); the certification authority device operating on said self-signed implicit certificate IC_(CA root) to derive a string representing a public-key reconstruction value B_(CA); the certification authority device obtaining said public-key reconstruction value B_(CA) from said string; the certification authority device verifying the validity of said public-key reconstruction value B_(CA); and the certification authority device operating on said integer e and said public-key reconstruction value B_(CA) to obtain said root public key Q_(CA root), said root public key Q_(CA root) corresponding to a root private key generated by said certification authority device.
 24. The method of claim 23 wherein said root public key is an element of said elliptic curve group of the form Q_(CA root)=eB_(CA). 